Visual Enhancement of Interval Changes Using Temporal Subtraction

ABSTRACT

Method to bring out a temporal difference between corresponding structures in a reference image R and a floating image F by convolving the reference image R and the floating image F with a window function H w  to generate R w  and F w , applying a non-rigid transformation resulting in a transformation field g(r R ) mapping every location r R  to a corresponding location r F  in the floating image F and generating a subtraction image by performing subtraction R w (r)−F w (g(r)) wherein r represents a voxel (x, y, z) in reference image R.

RELATED APPLICATIONS

This application claims priority to European Patent Application No. EP 07102012.7, filed on Feb. 9, 2007, and claims the benefit under 35 USC 119(e) of U.S. Provisional Application No. 60/889,774, filed on Feb. 14, 2007, both of which are incorporated herein by reference in their entirety.

This application is related to U.S. Application No. ______, filed on even date herewith, by Dieter Seghers et al, entitled. “Visual Enhancement of Interval Changes Using Temporal Subtraction,” and U.S. Application No. ______, filed on even date herewith, by Dieter Seghers et al, entitled “Visual Enhancement of Interval Changes Using Temporal Subtraction.”

BACKGROUND OF THE INVENTION

Patient follow-up is a major part of the daily clinical practice of the radiologist. To detect pathological changes as growing nodules, interstitial infiltrates and pleural effusions in the lungs, a current thorax image is compared with a previous recorded image. Temporal subtraction is a popular technique to aid the radiologist with this time consuming task. A previous image is subtracted from the current image after proper alignment and warping to visually enhance the pathological changes. Several studies have shown that a system with temporal subtraction significantly increases the detection rate of interval changes in digital chest radiographs. Studies have also shown that the technique also positively influences the radiologist's interpretation time. A few studies have applied temporal subtraction of CT images for cancer detection.

Nowadays, temporal subtraction of chest radiographs has made its entrance in commercially available CAD systems.

Prior to subtracting one image from the other, alignment of the corresponding anatomical structures is needed to remove irrelevant information from the subtraction image. Computed radiography or computed tomography images of the thorax suffer from non-rigid geometric distortions caused by the 3D displacement of corresponding structures due to differences in patient pose and inhalation, which pleads for the choice of a nonrigid registration algorithm. On the other hand, non-rigid warping has the unwanted effect of changing the size of a lesion. A tumor in a previous image might be blown up to match the tumor in the current image, such that no changes can be observed in the subtraction image. Hence, most authors use a warping technique which does not allow for large local deformations. For example, D. Loeckx et al., “Temporal subtraction of thorax CR images using a statistical deformation model”, IEEE Trans. Med. Imag. 22(11), pp. 1490-1504, 2003 applied a PCA deformation field which was trained on example deformations to capture inhalation and pose difference modes.

SUMMARY OF THE INVENTION

The present invention relates to a visual enhancement technique to improve the detection of pathological changes from medical images acquired at different times.

It is an aspect of this invention to provide a method to bring out a temporal difference between corresponding structures in medical images that overcomes the drawbacks of the prior art.

Other aspects of the present invention will become apparent from the description given below.

In general according to one aspect, the invention features a method to bring out a temporal difference between corresponding structures in a reference image R and a floating image F. The method comprises the steps of convolving said reference image R with a window function H_(w) to generate R_(w), convolving said floating image F with the same window function H_(w) to generate F_(w), applying a non-rigid transformation resulting in a transformation field g(r_(R)) mapping every location r_(R) to a corresponding location r_(F) in the floating image F, generating a subtraction image by performing subtraction R_(w)(r)−F_(w)(g(r)), wherein r represents a voxel (x, y, z) in reference image R.

The present invention concerns an alternative subtraction technique using a convolution filter to avoid a changed pathology to disappear in the subtraction image in the case of an accurate registration. The method is validated for temporal CT data sets of the thorax for lung cancer follow-up and compared to the conventional subtraction techniques using an automated objective measure.

The convolution is performed by means of a window function which is in one embodiment an averaging function. Alternative functions may be envisaged.

The size of the window function is preferably related to the dimensions of the structure. It preferably has similar dimensions to the dimensions of the structure.

The present invention is generally implemented as a computer program product adapted to carry out the method of any of the claims when run on a computer and is stored on a computer readable medium.

The above and other features of the invention including various novel details of construction and combinations of parts, and other advantages, will now be more particularly described with reference to the accompanying drawings and pointed out in the claims. It will be understood that the particular method and device embodying the invention are shown by way of illustration and not as a limitation of the invention. The principles and features of this invention may be employed in various and numerous embodiments without departing from the scope of the invention.

BRIEF DESCRIPTION OF THE DRAWINGS

In the accompanying drawings, reference characters refer to the same parts throughout the different views. The drawings are not necessarily to scale; emphasis has instead been placed upon illustrating the principles of the invention. Of the drawings:

FIG. 1 shows the original and follow-up scans together in three orthogonal views which are updated each time the user clicks a new viewpoint. Both images are shown simultaneously such that the image points that coincide with the viewpoint q are corresponding points according to the deformation field. The only transformation applied to the floating image is a translation such that the size of the pathologies is preserved.

FIG. 2 illustrates that the deformation field (c) deforms the simulated reference nodule (b) almost perfectly onto the floating nodule (a). The deformed floating nodule is estimated by interpolating the floating nodule according to the deformation field. The difference image (d) is then computed by subtracting the deformed floating from the reference image. As the registration is perfect, the temporal subtraction does not enhance interval changes. The intensities range from 0 to 1 for (a) and (b) and from −1 to 1 in (d).

FIG. 3: Consider the corresponding voxels g(r) and r in the floating (a) and reference (b) image respectively. Instead of subtracting the corresponding intensity values which would yield a zero valued voxel, an alternative approach to compute the subtraction image is applied. In a first step towards this solution, one computes the amount of density available in both images in a region surrounding the corresponding voxels, by integrating the intensities with a template H_(w) centered at the voxel of interest (c-d). As the simulated nodule has grown, the density amount in the reference image at r will be larger than the amount in the floating image at g(r).

FIG. 4 shows the comparison of the conventional method (first row) and the alternative method (second row) for the simulated grown nodule in FIG. 2 with several registration errors: (a) perfect registration, (b) Δx₁=2, Δy₁=2 and Δr₁=0, (c) Δx₁=0, Δy₁=0 and Δr₁=3, (d) Δx₁=0, Δy₁=0 and Δr₁=−3 and (e) Δx₁=2, Δy₁=2 and Δr₁=3. The alternative method clearly enhances the interval changes when a perfect registration is applied. This method also seems to be more robust to registration errors than the standard method, as for each case a white spot surrounded by a more or less black region is generated.

FIG. 5 shows the described viewer with three extra views of the subtracted image. The subtraction image immediately attracts the reader's attention to four grown modules.

FIG. 6 illustrates the comparison of the two subtraction methods. The alternative subtraction image (a) shows a white spot caused by a grown module. The same slice of the subtraction image using the conventional method does not enhance this pathological change (b).

DETAILED DESCRIPTION OF THE PREFERRED EMBODIMENTS

Image Registration

To visually enhance the pathological changes between images of the same patient acquired at different points in time, nonrigid registration is necessary to align both images such that corresponding structures coincide. The first image acquired in time is called the original scan F (floating image) and we will refer to the image acquired at a later point in time as the follow-up scan R (reference image). For the registration, a nonrigid tensor-product B-spline transformation model is adopted, using mutual information (MI) as similarity measure. The resulting transformation that maps every location r_(R) onto a corresponding location r_(F) will be referred to as g(r_(R)).

Follow-Up Viewer

An image viewer (FIG. 1) that accommodates the needs of follow-up applications has been developed.

As the reader of the temporal images is interested in the detection of pathological changes, the viewer needs to display anatomical corresponding structures of both scans simultaneously. This is the case for viewers which show the warped original scan and the follow-up scan together. Unfortunately, such a viewer might conceal pathology changes as the non-rigid warping can have the unwanted effect of changing the size of the pathology.

To compensate for this, a viewer is presented that aligns corresponding structures in both scans while avoiding a nonrigid transformation of the floating image F. Instead, the only transformation applied to the floating image is a translation. The translation depends on the viewpoint q selected by the user, and varies with varying viewpoint. This is accomplished as follows:

Compute the image point of the reference image r_(R) corresponding to the viewpoint q(x, y, z).

Apply the nonrigid deformation field g(r_(R) ) to find the corresponding point r_(F) in the floating image.

Finally, translate the floating image such that r_(F) coincides with q.

1] Thus, the original and follow-up scans are shown together in three orthogonal views which are updated each time the user clicks a new viewpoint. Both images are shown simultaneously such that the image points that coincide with the viewpoint q are corresponding points according to the deformation field. The viewer obeys the conditions stated above. Primarily, by applying a translation to the original scan for each viewpoint, anatomical structures of both scans are shown concurrently. Secondly, as a translation is a rigid transformation the size of the pathologies is preserved.

Temporal Subtraction

Conventional Method

Once the temporal images are aligned, a subtraction image S is constructed by subtracting the intensities of corresponding voxels:

S(r)=R(r)−F(g(r))   (1)

with R, F and g(r) the reference image, floating image and transformation field given by the registration algorithm. As the reference image is the most recent scan, a white region in the subtraction image indicates that tissue has become more dense at the corresponding region and vice versa.

Several clinical validation studies have shown the improved detection of interval changes when the temporal subtraction image is offered. On the other hand, one should keep the following issues in mind when implementing and interpreting this technique.

Firstly, the temporal subtraction image might become problematic if the registration algorithm allows for large local deformations. This is demonstrated in FIG. 2.

Generally, one can state that the subtraction image is misleading when the transformation field changes the size of the pathology locally. Hence, only global deforming registration algorithms are applicable for this technique.

Secondly, the clinician who reads the subtraction images must be aware of registration artifacts, which induce a low signal-to-noise ratio. A training phase is needed for the clinician to be able to distinct registration artifacts from true interval change patterns.

Alternative Method

According to the present invention an alternative method is disclosed to compute the subtraction image.

It avoids the interval changes to disappear when the pathology in the reference image is matched onto the pathology in the floating image. This is achieved as follows (FIG. 3).

Consider the corresponding voxels g(r) and r in the floating (a) and reference (b) image respectively. Instead of subtracting the corresponding intensity values which would yield a zero valued voxel, an alternative approach is presented. First, the amount of density is computed which is available in both images in a region surrounding the corresponding voxels, by integrating the intensities with a template H_(w) centered at the voxel of interest. This is shown in FIG. 3( c-d). As the simulated nodule has grown, the density amount in the reference image at r will be larger than the amount in the floating image at g(r). The template H_(w) with dimensions (w, w, w) has normalized intensities

$\begin{matrix} {{\sum\limits_{x = 0}^{w - 1}{\sum\limits_{y = 0}^{w - 1}{\sum\limits_{z = 0}^{w - 1}{H_{w}\left( {x,y,z} \right)}}}} = 1} & (2) \end{matrix}$

and is symmetrical with respect to x,y and z at its center. Hence, measuring the amount of density I_(w) at each voxel (x, y, z) of an image I is equal to convolving the image with the template H_(w):

I _(w)(x, y, z)=I(x, y, z)

H _(w)(x, y, z)   (3)

In a second step, the subtraction value S_(w) at voxel r=(x, y, z) is then computed as the change in density at that location:

S _(w)(r)=R(r)−F _(w)(g(r))   (4)

with

R _(w)(x, y, z)=R(x, y, z)

H _(w)(x, y, z)

F _(w)(x, y, z)=F(x, y, z)

H _(w)(x, y, z)

If the window size of the template H_(w) is set to one, expression (4) simplifies to the conventional computed subtraction image (1).

EXPERIMENTS Experiment I

In a first experiment, the methods (1) and (4) are compared for the simulated images of FIG. 2: the floating image (a) contained a nodule at (x₁, y₁)=(40,40) with radius r₁=10, the nodule in the reference image (b) was centered at (x₂, y₂)=(60, 60) and had radius r₂=20. Both images had dimensions 100×100. A constant template function H_(w)=1/w² with window size w=11 was chosen. We used a mathematical deformation model to transform the reference nodule (x₂, y₂, r₂) to the nodule (x₁+Δx₁, y₁+Δy₁, r₁+Δr₁). The parameters Δx₁, Δy₁ and Δr₁ were introduced to simulate registration errors. FIG. 4 compares the conventional method (first row) and the alternative method (second row) for several registration errors: (a) perfect registration, (b) Δx₁=2, Δy₁=2, Δr₁=0, (c) Δx₁=0, Δy₁=0, Δr₁=3, (d) Δx₁=0, Δy₁=0, Δr₁=−3 and (e) Δx₁=2, Δy₁=2, Δr₁=3.

The alternative method clearly enhances the interval changes when a perfect registration is applied. This method also seems to be more robust to registration errors than the standard method, as for each case a white spot surrounded by a more or less black region is generated.

Experiment II

The technique according to the present invention was tested on temporal CT data sets of the thorax for patient follow-up. Four cases, each consisting of two temporal images were involved in this study: two patients contained malignant nodules, one patient had a growing tumor and one case contained metastases. The time between consecutive acquisitions ranged from 39 to 57 days. Each scan consisted of 5-mm slices of dimensions 512×512.

The follow-up scan was registered to the original scan in each of the four cases using the registration algorithm described higher. For the two nodule cases, the registration accuracy was expressed by computing the distance between the nodules in the original scan and the nodules in the follow-up scan after alignment. The registration accuracy was 2.0±1.4 millimeter for the first nodule case and 5.8±3.1 for the second patient. Similar registration accuracies were measured for the two other data sets.

The subtraction images were computed using a template function H_(w) with w_(x)=w_(y)=11 and w_(z)=3. The viewer described higher extended with three extra views of the subtraction image is shown in FIG. 5. The subtraction image immediately attracts the readers attention to four grown nodules. FIG. 6 visually compares both subtraction methods. The alternative subtraction image (a) shows a white spot caused by a grown nodule. The same slice of the subtraction image using the conventional method does not enhance this pathological change (b).

Experiment III

Essentially, the subtraction image is intended as a tool for the visual enhancement of pathological changes, but it can also serve as a preprocessing step towards automated detection of interval changes. A grown nodule for example, is characterized by a specific pattern in the subtraction image. This enables the automated detection of a grown nodule and offers an opportunity to compare the two subtraction methods quantitatively: if we build a detection system based on one of the two subtraction methods, the outcome of this system to a detection experiment serves as an objective measure for this method.

The following experiment was performed. First, 14 grown nodules were detected manually in the data sets of the previous experiment. Secondly, the 2D intensity patterns around the nodule locations in the corresponding slices of the subtraction image were used to train a pattern detector. An example of a pattern detector may be based on 2D intensity patterns as described in ‘Image segmentation using local shape and gray-level appearance models’, D. Seghers, D. Loeckx, F. Maes, P. Suetens in Proc. SPIE Conference on Medical Imaging, 2006.

Alternatively, the pattern detector may be based on center-surround filters.

The detection system is then validated with a leave-one-out approach: one of the nodules is removed from the training set, the detector is trained again on the reduced training set and finally, the detector is asked to find the location of the removed nodule in the corresponding slice of the subtraction image.

The pattern detector builds a statistical model of profiles consisting of n_(c) points sampled on a circle with radius r_(c) centered around the nodule location. The profiles are sampled in 60 LOI feature images. The leave-one-out experiment is repeated for different profile configurations: r_(c)=2.5,5 and 10 pixels and n_(c)=3,4,6 and 8. Table 1 reports the results of the detection systems using (a) the conventional method and (b) the method introduced in this disclosure. The alternative method seems to perform significantly better that the standard method.

TABLE 1(a) n_(c) = 3 n_(c) = 4 n_(c) = 6 n_(c) = 8 r_(c) = 2 4 6 6 5 r_(c) = 5 6 7 6 7 r_(c) = 10 5 6 5 5

TABLE 1(b) n_(c) = 3 n_(c) = 4 n_(c) = 6 n_(c) = 8 r_(c) = 2 4 8 8 7 r_(c) = 5 5 9 8 8 r_(c) = 10 7 7 7 8

While this invention has been particularly shown and described with references to preferred embodiments thereof, it will be understood by those skilled in the art that various changes in form and details may be made therein without departing from the scope of the invention encompassed by the appended claims. 

1. A method to bring out a temporal difference between corresponding structures in a reference image R and a floating image F, the method comprising: convolving said reference image R with a window function H_(w) to generate R_(w), convolving said floating image F with the same window function H_(w) to generate F_(w), applying a non-rigid transformation resulting in a transformation field g(r_(R)) mapping every location r_(R) to a corresponding location r_(F) in the floating image F, generating a subtraction image by performing subtraction R_(w)(r)−F_(w)(g(r)) wherein r represents a voxel (x, y, z) in reference image R.
 2. A method according to claim 1 wherein said window function is an averaging function.
 3. A method according to claim 2 wherein the size of said window function is related to the dimensions of said structure.
 4. A method according to claim 1 wherein the size of said window function is related to the dimensions of said structure.
 5. A computer software product for bringing out a temporal difference between corresponding structures in a reference image R and a floating image F, the product comprising a computer-readable medium in which program instructions are stored, which instructions, when read by a computer, cause the computer to: convolve said reference image R with a window function H_(w) to generate R_(w), convolve said floating image F with the same window function H_(w) to generate F_(w), apply a non-rigid transformation resulting in a transformation field g(r_(R)) mapping every location r_(R) to a corresponding location r_(F) in the floating image F, and generate a subtraction image by performing subtraction R_(w)(r)−F_(w)(g(r)) wherein r represents a voxel (x, y, z) in reference image R.
 6. A computer software product for bringing out a temporal difference between corresponding structures in a reference image R and a floating image F, the product when executed read by a computer, causes the computer to: convolve said reference image R with a window function H_(w) to generate R_(w), convolve said floating image F with the same window function H_(w) to generate F_(w), apply a non-rigid transformation resulting in a transformation field g(r_(R)) mapping every location r_(R) to a corresponding location r_(F) in the floating image F, and generate a subtraction image by performing subtraction R_(w)(r)−F_(w)(g(r)) wherein r represents a voxel (x, y, z) in reference image R.
 7. A product according to claim 6 wherein said window function is an averaging function.
 8. A product according to claim 7 wherein the size of said window function is related to the dimensions of said structure.
 9. A product according to claim 6 wherein the size of said window function is related to the dimensions of said structure. 